M. Mendes Lopes, R. Pardini
Published 1999-10-14, updated 2000-09-18Version 3
A minimal surface of general type with $p_g(S)=0$ satisfies $1\le K^2\le 9$ and it is known that the image of the bicanonical map $\fie$ is a surface for $K_S^2\geq 2$, whilst for $K^2_S\geq 5$, the bicanonical map is always a morphism. In this paper it is shown that $\fie$ is birational if $K_S^2=9$ and that the degree of $\fie$ is at most 2 if $K_S^2=7$ or $K_S^2=8$. By presenting two examples of surfaces $S$ with $K_S^2=7$ and 8 and bicanonical map of degree 2, it is also shown that this result is sharp. The example with $K_S^2=8$ is, to our knowledge, a new example of a surface of general type with $p_g=0$.
Comments: LaTeX 2e, 15 pages, to appear. Minor typos, change of title (title of the previous version: "A note on surfaces of general type with $p_g=0$ and $K^2\ge 7$") and added one example of a surface, showing that the main result is sharp
Surfaces with $p_g = 0$, $K^2 = 5$ and bicanonical maps of degree 4
A connected component of the moduli space of surfaces of general type with $p_g=0$
The degree of the bicanonical map of a surface with $p_g=0$
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